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Q: What kind of regular polygon can be used to form a tessellation?

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A tessellation that uses more than one kind of regular polygon is called a semi-regular tessellation.

Semi-regular tessellation.

Semi-regular tessellation

It is a semi-regular tessellation.

semi-regular

It is called a semi-regular tessellation.

It is an irregular tessellation.

Semi-regular tessellation is a tessellation of the plane by 2 or more different convex regular polygons. A semi-regular tessellation combines two or more regular polygons. Each semi-regular tessellation has a tupelo, which designates what kind of regular polygon is used.

semi-regular

More than one kind of regular polygon

It is a semi-regular tessellation.

A regular polygon is a special kind of convex polygon - one in which all the sides are of the same length and all the angles are equal. Convex and concave polygons form disjoint sets: so no concave polygon can be regular.

A regular polygon.

A regular pentagon (5 sides)

5

equilateral triangle is an example of regular polygon

It is a regular polygon as for example an equilateral triangle

A regular polygon having an interior angle measure of 168o has 30 sides and is called a triacontagon.

A regular polygon

This is the definition of a "regular" polygon.

it depends what kind of polygon but the sum of the angles will equal a # divisible by 90

I assume that, by "Loonie", you mean the Canadian coin. Strictly speaking, it is not a polygon because its sides are not straight lines but if they were, it would be a regular hendecagon - an 11-sided regular polygon.

No such regular polygon exist so it has to be some kind of irregular polygon but if each exterior angle was 30 degrees then it would be a regular 12 sided polygon

A regular polygon

You haven't given enough information. What kind of polygon is it?